https://github.com/cran/dtw
Revision f3fa0a2ccb9bde3782d3555dfc9ebd3381d1757f authored by Toni Giorgino on 30 November 2007, 00:00:00 UTC, committed by Gabor Csardi on 30 November 2007, 00:00:00 UTC
1 parent 8635857
Tip revision: f3fa0a2ccb9bde3782d3555dfc9ebd3381d1757f authored by Toni Giorgino on 30 November 2007, 00:00:00 UTC
version 0.4-2
version 0.4-2
Tip revision: f3fa0a2
stepPattern.R
###############################################################
# #
# Author: Toni Giorgino <toni.giorgino@gmail.com> #
# Laboratory for Biomedical Informatics #
# University of Pavia - Italy #
# www.labmedinfo.org #
# #
# $Id: dtw.R 10 2007-12-03 19:17:59Z tonig $
# #
###############################################################
## For pre-defined step patterns see below.
#############################
## Methods for accessing and creating step.patterns
stepPattern <- function(v) {
if(!is.vector(v)) {
stop("stepPattern creation only supported from vectors");
}
obj<-matrix(v,ncol=4,byrow=TRUE);
class(obj)<-"stepPattern";
return(obj);
}
is.stepPattern <- function(x) {
return(inherits(x,"stepPattern"));
}
## pretty-print the matrix meaning,
## so it will not be as write-only as now
print.stepPattern <-function(x,...) {
step.pattern<-x; # for clarity
np<-max(step.pattern[,1]); #no. of patterns
head<-"g[i,j] = min(\n";
body<-"";
## cycle over available step patterns
for(p in 1:np) {
steps<-.extractpattern(step.pattern,p);
ns<-dim(steps)[1];
## restore row order
steps<-steps[ns:1,];
## cycle over steps s in the current pattern p
for(s in 1:ns) {
di<-steps[s,1]; # delta in query
dj<-steps[s,2]; # delta in templ
cc<-steps[s,3]; # step cost multiplier
## make pretty-printable negative increments
dis<-ifelse(di==0,"",-di); # 4 -> -4; 0 -> .
djs<-ifelse(dj==0,"",-dj); # 0 maps to empty string
## cell origin, as coordinate pair
dijs<-sprintf("i%2s,j%2s",dis,djs);
if(cc==-1) { # g
gs<-sprintf(" g[%s]",dijs);
body<-paste(body,gs);
} else {
## prettyprint step cost multiplier in ccs: 1 -> .; 2 -> 2 *
ccs<-ifelse(cc==1,"",sprintf(" %d *",cc));
ds<-sprintf("+%s d[%s]",ccs,dijs);
body<-paste(body,ds);
}
}
body<-paste(body,",\n",s="");
}
tail<-")\n\n";
rv<-paste(head,body,tail);
cat("Step pattern recursion:\n");
cat(rv);
}
## TODO: sanity check on the step pattern definition
.checkpattern <- function(sp) {
## must have 4 x n elements
## all integers
## first column in ascending order from 1, no missing steps
## 2nd, 3rd row non-negative
## 4th: first time for each step is -1
}
## Extract rows belonging to pattern no. sn
## with first element stripped
## in reverse order
.extractpattern <- function(sp,sn) {
sbs<-sp[,1]==sn; # pick only rows beginning by sn
spl<-sp[sbs,-1]; # of those: take only column Di, Dj, cost
# (drop pattern no. column)
## make sure it stays a matrix
spl <- matrix(spl,ncol=3);
nr<-dim(spl)[1]; # how many are left
spl<-spl[nr:1,]; # invert row order
## make sure it stays a matrix
spl <- matrix(spl,ncol=3);
return(spl);
}
##################################################
##################################################
##
## Various step patterns, defined as internal variables
##
## Some knowledge of DP is required to modify this file.
## Step patterns taken from Sakoe, cited in documentation
## First column: enumerates step patterns.
## Second step in query index
## Third step in template index
## Fourth weight if positive, or -1 if starting point
## normalization: no
symmetric1 <- stepPattern(c(
1,0,1,-1,
1,0,0,1,
2,1,1,-1,
2,0,0,1,
3,1,0,-1,
3,0,0,1
));
## normalization: N+M
symmetric2 <- stepPattern(c(
1,0,1,-1,
1,0,0,1,
2,1,1,-1,
2,0,0,2,
3,1,0,-1,
3,0,0,1
));
## this one works
## normalization: N
asymmetric <- stepPattern(c(
1,1,0,-1,
1,0,0,1,
2,1,1,-1,
2,0,0,1,
3,1,2,-1,
3,0,0,1
));
## normalization: N
asymmetricItakura <- stepPattern(c(
1, 1, 2, -1,
1, 0, 0, 1,
2, 1, 1, -1,
2, 0, 0, 1,
3, 2, 1, -1,
3, 1, 0, 1,
3, 0, 0, 1,
4, 2, 2, -1,
4, 1, 0, 1,
4, 0, 0, 1
));
################################
## according to sakoe page 47
## but I'm not very positive about it
.asymmetricSakoe <- stepPattern(c(
1,0,1,-1,
2,1,1,-1,
2,0,0,1,
3,1,0,-1,
3,0,0,1
));
#############################
## Slope-limited versions
##
## Taken from Table I, page 47 of "Dynamic programming algorithm
## optimization for spoken word recognition," Acoustics, Speech, and
## Signal Processing, vol.26, no.1, pp. 43-49, Feb 1978 URL:
## http://ieeexplore.ieee.org/xpls/abs_all.jsp?arnumber=1163055
## Implementation of Sakoe's P=1, Symmetric algorithm
symmetricP1 <- stepPattern(c(
1,1,2,-1, # First branch: g(i-1,j-2)+
1,0,1,2, # + 2d(i ,j-1)
1,0,0,1, # + d(i ,j)
2,1,1,-1, # Second branch: g(i-1,j-1)+
2,0,0,2, # +2d(i, j)
3,2,1,-1, # Third branch: g(i-2,j-1)+
3,1,0,2, # + 2d(i-1,j)
3,0,0,1 # + d( i,j)
));
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